Fractional Hamiltonian type system on R with critical growth nonlinearity

Abstract

This article investigates the existence and properties of ground state solutions to the following nonlocal Hamiltonian elliptic system: align* cases (-)12 u +V0 u =g(v),~x∈ R (-)12 v +V0 v =f(u),~x∈ R, cases align* where (-)12 is the square root Laplacian operator, V0 >0 and f,~g have critical exponential growth in R. Using minimization technique over some generalized Nehari manifold, we show that the set S of ground state solutions is non empty. Moreover for (u,v) ∈ S, u,~v are uniformly bounded in L∞(R) and uniformly decaying at infinity. We also show that the set S is compact in H12(R) × H12(R) up to translations. Furthermore under locally lipschitz continuity of f and g we obtain a suitable Pohozaev type identity for any (u,v) ∈ S. We deduce the existence of semi-classical ground state solutions to the singularly perturbed system align* cases ε(-)12 +V(x) =g(),~x∈ R ε (-)12 +V(x) =f(),~x∈ R, cases align* where ε>0 and V ∈ C(R) satisfy the assumption (V) given below (see Section 1). Finally as ε → 0, we prove the existence of minimal energy solutions which concentrate around the closest minima of the potential V.